9. The dimensions of a cuboidal box are in the ratio 3:2:1 and the total surface area is
2,816 sq cm. Find its weight if dens

Question

9. The dimensions of a cuboidal box are in the ratio 3:2:1 and the total surface area is 2,816 sq cm. Find its weight if density of the cuboidal box is 1 g/cm​

Harper · Answer

Step-by-step explanation:   I think the weight should be 1g/cm³  Here, let  l= 3x  b= 2x and h= x  TSA= 2(lb+lh+bh)  2816cm²= 2(6x²+3x²+2x²)  2816cm²=2×11x²  256cm²=2x²  x= √256/2= 16/√2 = (8√2)cm  Vol³= l×b×h      = 3(8√2)cm ×2(8√2)cm×(8√2)cm      = 6cm³×512√8      =3072cm3×2√2= (6144√2)cm3= 8663.04cm3  therefore its weight= 8663.04cm³×1g/cm³= 8863.04g  or 8.86304 kg

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9. The dimensions of a cuboidal box are in the ratio 3:2:1 and the total surface area is2,816 sq cm. Find its weight if dens